Andrew Nicas scite author profile

We define a group-valued invariant of virtual knots and relate it to various other group-valued invariants of virtual knots, including the extended group of Silver-Williams and the quandle group of Manturov and Bardakov-Bellingeri. A virtual knot is called almost classical if it admits a diagram with an Alexander numbering, and in that case we show that the group factors as a free product of the usual knot group and Z. We establish a similar formula for mod p almost classical knots, and we use these results to derive obstructions to a virtual knot K being mod p almost classical. Viewed as knots in thickened surfaces, almost classical knots correspond to those that are homologically trivial. We show they admit Seifert surfaces and relate their Alexander invariants to the homology of the associated infinite cyclic cover. We prove the first Alexander ideal is principal, recovering a result first proved by Nakamura et al. using different methods. The resulting Alexander polynomial is shown to satisfy a skein relation, and its degree gives a lower bound for the Seifert genus. We tabulate almost classical knots up to 6 crossings and determine their Alexander polynomials and virtual genus.Comment: 44 page

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Alexander invariants for virtual knots

Bodén

Dies

Gaudreau

et al. 2015

J. Knot Theory Ramifications

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Abstract. Given a virtual knot K, we introduce a new group-valued invariant VGK called the virtual knot group, and we use the elementary ideals of VGK to define invariants of K called the virtual Alexander invariants. For instance, associated to the 0-th ideal is a polynomial HK (s, t, q) in three variables which we call the virtual Alexander polynomial, and we show that it is closely related to the generalized Alexander polynomial GK (s, t) introduced in [40,24,42]. We define a natural normalization of the virtual Alexander polynomial and show it satisfies a skein formula. We also introduce the twisted virtual Alexander polynomial associated to a virtual knot K and a representation : VGK → GLn(R), and we define a normalization of the twisted virtual Alexander polynomial. As applications we derive bounds on the virtual crossing numbers of virtual knots from the virtual Alexander polynomial and twisted virtual Alexander polynomial.

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Parameterized Lefschetz-Nielsen Fixed Point Theory and Hochschild Homology Traces

Geoghegan¹,

Nicas²

1994

American Journal of Mathematics

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An intersection homology invariant for knots in a rational homology 3-sphere

Frohman

Nicas

1994

Topology

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Andrew Nicas

Induction theorems for groups of homotopy manifold structures

Virtual knot groups and almost classical knots

Alexander invariants for virtual knots

Parameterized Lefschetz-Nielsen Fixed Point Theory and Hochschild Homology Traces

An intersection homology invariant for knots in a rational homology 3-sphere

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